Hossein Nadeb scite author profile

Hossein Nadeb

5Publications

29Citation Statements Received

66Citation Statements Given

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115

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Yazd University

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Stochastic comparisons of the largest claim amounts from two sets of interdependent heterogeneous portfolios

Nadeb¹,

Torabi²,

Dolati³

2020

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Let X λ1 , . . . , X λn be dependent non-negative random variables and Y i = I pi X λi , i = 1, . . . , n, where I p1 , . . . , I pn are independent Bernoulli random variables independent of X λi 's, with E[I pi ] = p i , i = 1, . . . , n. In actuarial sciences, Y i corresponds to the claim amount in a portfolio of risks.In this paper, we compare the largest claim amounts of two sets of interdependent portfolios, in the sense of usual stochastic order, when the variables in one set have the parameters λ 1 , . . . , λ n and p 1 , . . . , p n and the variables in the other set have the parameters λ

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New results on stochastic comparisons of finite mixtures for some families of distributions

Nadeb

Torabi

2020

Communications in Statistics - Theory and Methods

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Stochastic Comparisons between the Extreme Claim Amounts from Two Heterogeneous Portfolios in the Case of Transmuted-G Model

Nadeb

Torabi

Dolati

2020

North American Actuarial Journal

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Let X λ1 , . . . , X λn be independent non-negative random variables belong to the transmuted-G model and let Y i = I pi X λi , i = 1, . . . , n, where I p1 , . . . , I pn are independent Bernoulli random variables independent of X λi 's, with E[I pi ] = p i , i = 1, . . . , n. In actuarial sciences, Y i corresponds to the claim amount in a portfolio of risks. In this paper we compare the smallest and the largest claim amounts of two sets of independent portfolios belonging to the transmuted-G model, in the sense of usual stochastic order, hazard rate order and dispersive order, when the variables in one set have the parameters λ 1 , ..., λ n and the variables in the other set have the parameters λ * 1 , ..., λ * n . For illustration we apply the results to the transmuted-G exponential and the transmuted-G Weibull models.

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Stress-strength Reliability of Exponential Distribution based on Type-I Progressively Hybrid Censored Samples

Mirjalili¹,

Torabi²,

Nadeb³

et al. 2016

JSRI

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Abstract. This paper considers the estimation of the stress-strength parameter, say R, based on two independent Type-I progressively hybrid censored samples from exponential populations with different parameters. The maximum likelihood estimator and asymptotic confidence interval for R are obtained. Bayes estimator of R is also derived under the assumption of independent gamma priors. A Monte Carlo simulation study is used to evaluate the performance of maximum likelihood estimator, Bayes estimator and asymptotic confidence interval. Finally, a pair of real data sets is analyzed for illustrative purposes.

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Stress-strength reliability of exponentiated Fréchet distributions based on Type-II censored data

Nadeb

Torabi

Zhao

2019

Journal of Statistical Computation and Simulation

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Hossein Nadeb

Stochastic comparisons of the largest claim amounts from two sets of interdependent heterogeneous portfolios

New results on stochastic comparisons of finite mixtures for some families of distributions

Stochastic Comparisons between the Extreme Claim Amounts from Two Heterogeneous Portfolios in the Case of Transmuted-G Model

Stress-strength Reliability of Exponential Distribution based on Type-I Progressively Hybrid Censored Samples

Stress-strength reliability of exponentiated Fréchet distributions based on Type-II censored data

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